$f命题1:$设$fleft( x ight) in {C^1}left( { - infty , + infty } ight)$,令[{f_n}left( x ight) = nleft[ {fleft( {x + frac{1}{n}} ight) - fleft( x ight)} ight]]
证明:对任意$x in left[ {a,b} ight] subset left( { - infty , + infty } ight)$,有${f_n}left( x ight)$一致收敛于$f'left( x ight)$
证明:由$fleft( x
ight) in {C^1}left( { - infty , + infty }
ight)$知,$f'left( x
ight) in Cleft[ {a,b}
ight]$,则
由$f{Cantor定理}$知,$f'left( x ight)$在$left[ {a,b} ight]$上一致连续,即对任意$varepsilon > 0$,存在$delta > 0$,使得对任意的$x,y in left[ {a,b} ight]$满足$left| {x - y} ight| < delta $时,有[left| {f'left( x ight) - f'left( y ight)} ight| < varepsilon ]
由微分中值定理知,存在${xi _n} in left( {x,x + frac{1}{n}}
ight)$,使得
[{f_n}left( x
ight) = nf'left( {{xi _n}}
ight)frac{1}{n} = f'left( {{xi _n}}
ight)]
取$N = frac{1}{delta }$,则当$n > N$时,对任意$x in left[ {a,b}
ight]$,有[left| {x - {xi _n}}
ight| < delta ]
从而有[left| {f'left( x
ight) - f'left( {{xi _n}}
ight)}
ight| < varepsilon ]
所以对任意$varepsilon > 0$,存在$N = frac{1}{delta } > 0$,使得当$n > N$时,对任意$x in left[ {a,b}
ight]$,有[left| {f'left( x
ight) - {f_n}left( x
ight)}
ight|{
m{ = }}left| {f'left( x
ight) - f'left( {{xi _n}}
ight)}
ight| < varepsilon ]
从而由函数列一致收敛的定义即证
$f注1:$$N$的取值由不等式${left| {x - {xi _n}} ight| < delta }$放缩得到
$f注2:$由于$f'left( x
ight) in Cleft( { - infty , + infty }
ight)$,所以[ lim limits_{n o infty } {f_n}left( x
ight) = mathop {lim }limits_{n o infty } frac{{fleft( {x + frac{1}{n}}
ight) - fleft( x
ight)}}{{frac{1}{n}}} = f'left( x
ight)]
即${f_n}left( x
ight)$在$left( { - infty , + infty }
ight)$上处处收敛于$f'left( x
ight)$